Non Affine Garch Option Pricing Models Variance Dependent Kernels And Diffusion Limits
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Author | : Alex Badescu |
Publisher | : |
Total Pages | : 54 |
Release | : 2017 |
Genre | : |
ISBN | : |
This paper investigates the pricing and weak convergence of an asymmetric non-affine, non-Gaussian GARCH model when the risk-neutralization is based on a variance dependent exponential linear pricing kernel with stochastic risk aversion parameters. The risk-neutral dynamics are obtained for a general setting and its weak limit is derived. We show how several GARCH diffusions, martingalized via well-known pricing kernels, are obtained as special cases and we derive necessary and sufficient conditions for the presence of financial bubbles. An extensive empirical analysis using both historical returns and options data illustrates the advantage of coupling this pricing kernel with non-Gaussian innovations.
Author | : Alex Badescu |
Publisher | : |
Total Pages | : 30 |
Release | : 2015 |
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ISBN | : |
This paper investigates the weak convergence of general non-Gaussian GARCH models together with an application to the pricing of European style options determined using an extended Girsanov principle and a conditional Esscher transform as the pricing kernel candidates. Applying these changes of measure to asymmetric GARCH models sampled at increasing frequencies, we obtain two risk neutral families of processes which converge to different bivariate diffusions, which are no longer standard Hull-White stochastic volatility models. Regardless of the innovations used, the GARCH implied diffusion limit based on the Esscher transform can be obtained by applying the minimal martingale measure under the physical measure. However, we further show that for skewed GARCH driving noise, the risk neutral diffusion limit of the extended Girsanov principle exhibits a non-zero market price of volatility risk which is proportional to the market price of the equity risk, where the constant of proportionality depends on the skewness and kurtosis of the underlying distribution. Our theoretical results are further supported by numerical simulations and a calibration exercise to observed market quotes.
Author | : Alex Badescu |
Publisher | : |
Total Pages | : 30 |
Release | : 2017 |
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ISBN | : |
In this paper, we derive fully explicit closed-form expressions for the fair strike prices of discrete-time variance swaps under general affine GARCH type models that have been risk-neutralized with a family of variance dependent pricing kernels. The methodology relies on solving differential recursions for the coefficients of the joint cumulant generating function of the log price and the conditional variance processes. An alternative derivation is provided in the case of Gaussian innovations. Using standard assumptions on the asymptotic behavior of the GARCH parameters as the sampling frequency increases, we derive the diffusion limit of a Gaussian GARCH model and we further investigate the convergence of the variance swap prices to its continuous-time limit. Numerical examples on the term structure of the variance swap rates and on the convergence results are also presented.
Author | : Marcos Escobar |
Publisher | : |
Total Pages | : 0 |
Release | : 2023 |
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Author | : Alex Badescu |
Publisher | : |
Total Pages | : 14 |
Release | : 2016 |
Genre | : |
ISBN | : |
In this paper we study a conditional version of the Wang transform in the context of discrete GARCH models and their diffusion limits. Our first contribution shows that the conditional Wang transform and Duan's generalized local risk-neutral valuation relationship based on equilibrium considerations, lead to the same GARCH option pricing model. We derive the weak limit of an asymmetric GARCH model risk-neutralized via Wang's transform. The connection with stochastic volatility limits constructed using other standard pricing kernels, such as the conditional Esscher transform or the extended Girsanov principle, is further investigated by comparing the corresponding market prices of variance risk.
Author | : Steven L. Heston |
Publisher | : |
Total Pages | : 34 |
Release | : 2014 |
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This paper develops a closed-form option pricing formula for a spot asset whose variance follows a GARCH process. The model allows for correlation between returns of the spot asset and variance and also admits multiple lags in the dynamics of the GARCH process. The single factor (one lag) version of this model contains Heston's (1993) stochastic volatility model as a diffusion limit and therefore unifies the discrete GARCH and continuous-time stochastic volatility literature of option pricing. The new model provides the first option formula for a random volatility model that is solely a function of observables; all the parameters can be easily estimated from the history of asset prices, observed at discreteintervals. Empirical analysis on Samp;P500 index options shows the single factor version of the GARCH model to be a substantial improvement over the Black-Scholes (1973) model. The GARCH model continues to substantially outperform the Black-Scholes model even when the Black-Scholes model is updated every period while the parameters of the GARCH model are held constant. The improvement is due largely to the ability of the GARCH model to describe the correlation of volatility with spot returns. This allows the GARCH model to capture strike price biases in the Black-Scholes model that give rise to the skew in implied volatilities in the index options market.
Author | : Steven L. Heston |
Publisher | : |
Total Pages | : 24 |
Release | : 1998 |
Genre | : Options (Finance) |
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Author | : Kadir Gokhan Babaoglu |
Publisher | : |
Total Pages | : |
Release | : 2016 |
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My dissertation, composed of two chapters, explores the pricing of index and individual equity options contracts. These chapters make three modeling choices on (i) state variables, (ii) return innovations and (iii) the pricing kernel, and answer the question about what we can learn from stocks and options data. Both chapters specify a variance-dependent pricing kernel, which allows non-monotonicity when projected onto returns. While first chapter employs Inverse Gaussian distribution to capture fat-tailed dynamics of returns, second chapter chooses to model distribution of returns as a normal shock plus Compound Poisson jumps. Regarding the state variables, Chapter 1 uses long-run and short-run variance components, whereas Chapter 2 defines normal and jump variance components as the state variables. The first chapter nests multiple volatility components, fat tails and a variance-dependent pricing kernel in a single option model and compare their contribution to describing returns and option data. All three features lead to statistically significant model improvements. A variance-dependent pricing kernel is economically most important and improves option fit by 17% on average and more so for two-factor models. A second volatility component improves the option fit by 9% on average. Fat tails improve option fit by just over 4% on average, but more so when a variance-dependent pricing kernel is applied. Overall these three model features are complements rather than substitutes: the importance of one feature increases in conjunction with the others. Focusing on individual equity options, second chapter develops a new factor model that explores (i) if a separate beta for market jumps is needed, (ii) cross-sectional differences in jump betas of stocks, and (iii) the role of jump betas in explaining equity option prices. Differentiating between normal beta and jump beta, the model predicts that a stock with higher sensitivity to market jumps (normal shocks) have higher out-of-the-money (at-the-money) option prices. The results show that jump betas are needed to adequately explain equity options.
Author | : Steven L. Heston |
Publisher | : |
Total Pages | : 44 |
Release | : 1997 |
Genre | : Capital assets pricing model |
ISBN | : |
Author | : 雷衣鼎 |
Publisher | : |
Total Pages | : |
Release | : 2014 |
Genre | : |
ISBN | : |
We take a similar form of pricing kernel which developed by Christoffersen et al (2013) to extend the multiple volatility components model. By that way, we can obtain a more elaborate model which also explains some puzzles in the market. Apart from that, a surprise result is we don't need to estimate full parameters in model. Instead of that, we estimate the scaling factor which plays an important role when changing of measure. Empirical tests demonstrate the well ability of generalized model when reconcile time series properties of stock returns with the option prices. Furthermore, we also use the in-sample and out-sample for testing the predictability of the generalized model. The result shows the pricing kernel more or less enhancing the predictability than before..